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Journal of the Optical Society of America A

Journal of the Optical Society of America A

| OPTICS, IMAGE SCIENCE, AND VISION

  • Vol. 15, Iss. 5 — May. 1, 1998
  • pp: 1268–1276

Pulsed-beam propagation in lossless dispersive media. I. Theory

Timor Melamed and Leopold B. Felsen  »View Author Affiliations


JOSA A, Vol. 15, Issue 5, pp. 1268-1276 (1998)
http://dx.doi.org/10.1364/JOSAA.15.001268


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Abstract

This first part of a two-part investigation is concerned with the effects of dispersion on the propagation characteristics of the scalar field associated with a highly localized pulsed-beam (PB) wave packet in a lossless homogeneous medium described by the generic wave-number profile k(ω)=ω/c(ω), where c(ω) is the frequency-dependent wave propagation speed. While comprehensive studies have been performed for the one-dimensional problem of pulsed plane-wave propagation in dispersive media, particularly for specific c(ω) profiles of the Lorentz or Debye type, even relatively crude measures tied to generic k(ω) profiles do not appear to have been obtained for the three-dimensional problem associated with a PB wave packet with complex frequency and wave-number spectral constituents. Such wave packets have been well explored in nondispersive media, and simple asymptotic expressions have been obtained in the paraxial range surrounding the beam axis. These paraxially approximated wave objects are now used to formulate the initial conditions for the lossless generic k(ω) dispersive case. The resulting frequency inversion integral is reduced by simple saddle-point asymptotics to extract the PB phenomenology in the well-developed dispersive regime. The phenomenology of the transient field is parameterized in terms of the space–time evolution of the PB wave-front curvature, spatial and temporal beam width, etc., as well as in terms of the corresponding space–time-dependent frequencies of the signal, which are related to the local geometrical properties of the k(ω) dispersion surface. These individual parameters are then combined to form nondimensional critical parameters that quantify the effect of dispersion within the space–time range of validity of the paraxial PB. One does this by performing higher-order asymptotic expansions beyond the paraxial range and then ascertaining the conditions for which the higher-order terms can be neglected. In Part II [J. Opt. Soc. Am. A 15, 1276 (1998)], these studies are extended to include the transitional regime at those early observation times for which dispersion is not yet fully developed. Also included in Part II are analytical and numerical results for a simple Lorentz model that permit assessment of the performance of various nondimensional critical estimators.

© 1998 Optical Society of America

OCIS Codes
(050.1940) Diffraction and gratings : Diffraction
(260.2030) Physical optics : Dispersion
(270.5530) Quantum optics : Pulse propagation and temporal solitons
(350.5500) Other areas of optics : Propagation

History
Original Manuscript: September 2, 1997
Revised Manuscript: January 15, 1998
Manuscript Accepted: December 2, 1997
Published: May 1, 1998

Citation
Timor Melamed and Leopold B. Felsen, "Pulsed-beam propagation in lossless dispersive media. I. Theory," J. Opt. Soc. Am. A 15, 1268-1276 (1998)
http://www.opticsinfobase.org/josaa/abstract.cfm?URI=josaa-15-5-1268


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References

  1. K. A. Connor, L. B. Felsen, “Gaussian pulses as complex-source-point solutions in dispersive media,” Proc. IEEE 62, 1614–1615 (1974). [CrossRef]
  2. K. E. Oughstun, G. C. Sherman, Electromagnetic Pulse Propagation in Causal Dielectrics, Vol. 16 of Springer Series on Wave Phenomena (Springer, New York, 1997).
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  12. T. Melamed, E. Heyman, L. B. Felsen, “Local spectral analysis of short-pulse-excited scattering from weakly inhomogeneous media: Part I. Forward scattering,” Department of Aerospace and Mechanical Engineering, Boston University, Boston, Mass. 02215, , 1997.
  13. T. Melamed, E. Heyman, L. B. Felsen, “Local spectral analysis of short-pulse-excited scattering from weakly inhomogeneous media: Part II. Inverse scattering,” Department of Aerospace and Mechanical Engineering, Boston University, Boston, Mass. 02215, , 1997.
  14. E. Heyman, T. Melamed, “Certain considerations in aperture synthesis of ultrawideband/short-pulse radiation,” IEEE Trans. Antennas Propag. 42, 518–525 (1994). [CrossRef]
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  16. T. Melamed, L. B. Felsen, “Pulsed-beam propagation in lossless dispersive media. II. Applications,” J. Opt. Soc. Am. A 15, 1277–1284 (1998). [CrossRef]

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